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Journal of Combinatorial Optimization

Erschienen in:

21.12.2015

More bounds for the Grundy number of graphs

verfasst von: Zixing Tang, Baoyindureng Wu, Lin Hu, Manoucheher Zaker

Erschienen in: Journal of Combinatorial Optimization | Ausgabe 2/2017

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Abstract

A coloring of a graph \(G=(V,E)\) is a partition \(\{V_1, V_2, \ldots , V_k\}\) of V into independent sets or color classes. A vertex \(v\in V_i\) is a Grundy vertex if it is adjacent to at least one vertex in each color class \(V_j\) for every \(j<i\). A coloring is a Grundy coloring if every vertex is a Grundy vertex, and the Grundy number \(\Gamma (G)\) of a graph G is the maximum number of colors in a Grundy coloring. We provide two new upper bounds on Grundy number of a graph and a stronger version of the well-known Nordhaus-Gaddum theorem. In addition, we give a new characterization for a \(\{P_{4}, C_4\}\)-free graph by supporting a conjecture of Zaker, which says that \(\Gamma (G)\ge \delta (G)+1\) for any \(C_4\)-free graph G.

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Titel: More bounds for the Grundy number of graphs
verfasst von: Zixing Tang
Baoyindureng Wu
Lin Hu
Manoucheher Zaker
Publikationsdatum: 21.12.2015
Verlag: Springer US
Erschienen in: Journal of Combinatorial Optimization / Ausgabe 2/2017
Print ISSN: 1382-6905
Elektronische ISSN: 1573-2886
DOI: https://doi.org/10.1007/s10878-015-9981-8

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